共查询到19条相似文献,搜索用时 264 毫秒
1.
采用一种新的数值方法——微分求积单元法分析框架结构的P-△效应。微分求积单元法采用微分求积法直接求解微分方程的技术,并结合有限分割技术而形成。首先建立考虑剪切变形和轴力二阶效应的框架结构单元平衡微分方程,通过微分求积离散而得到梁单元的一般弹性刚度方程;同时考虑变形后节点的平衡条件和变形协调条件,导出框架结构整体二阶分析的微分求积单元法力学模型。由于该分析模型中包括了单元及结构的所有离散形式的控制方程,因此采用该模型进行结构分析可得出较为精确的解。数值算例的分析比较,表明了该法用于框架结构P-△效应分析的正确性和有效性。本文导出的框架结构二阶分析的微分求积单元法力学模型可用于框架结构剪切变形与几何非线性的耦合效应分析。 相似文献
2.
变截面构件在工程中应用广泛,在对变截面梁进行数值计算时,需要建立变截面梁单元的刚度矩阵。该文采用势能驻值原理,考虑了轴力引起的几何非线性和剪切变形的影响,将梁截面刚度的变化率作为小量,得到了近似到二阶的单元刚度矩阵。在构造位移模式时,从梁的微分平衡方程出发,得到同样近似到二阶、分别以三次和五次多项式表示的剪切和弯曲位移模式。该文还证明了单元刚度矩阵的奇异性,给出了轴压刚度的表达式,定量论证了与某些精确解的误差,表明在一定范围内,该文的结果具有足够的精度。最后以一个计算实例说明该文的单元刚度矩阵具有较快的收敛性。 相似文献
3.
本文对一类中心刚体-柔性梁系统在大范围转动下的刚柔耦合动力学问题进行了研究. 柔性梁为功能梯度材料(functionally graded materials, FGM)楔形变截面梁,材料体积分数在梁轴向呈幂律分布变化. 以弧长坐标来描述柔性FGM梁的几何位移关系,分别使用倾角和拉伸应变变量描述柔性梁的横向弯曲和纵向拉伸变形,并计及剪切效应. 采用假设模态法离散变形场,运用第二类拉格朗日方程进行方程推导,得到系统考虑剪切效应的刚柔耦合动力学模型. 基于全新的刚柔耦合动力学建模理论,研究不同轴向材料梯度分布的FGM楔形梁,通过数值仿真计算,分析讨论不同的转速、梯度分布规律以及变截面参数对系统动力学特性的影响. 结果表明,剪切效应对大高跨比的FGM楔形梁的变形影响较为明显,不容忽略;材料梯度分布规律和截面参数的选取均会对旋转FGM楔形梁的动力学响应和频率产生较大影响. 本文提出的考虑剪切效应的倾角刚柔耦合动力学模型是对以往非剪切模型的进一步完善,可应用于工程中的 Timoshenko梁结构的动力学问题求解. 相似文献
4.
本文对一类中心刚体-柔性梁系统在大范围转动下的刚柔耦合动力学问题进行了研究.柔性梁为功能梯度材料(functionally graded materials,FGM)楔形变截面梁,材料体积分数在梁轴向呈幂律分布变化.以弧长坐标来描述柔性FGM梁的几何位移关系,分别使用倾角和拉伸应变变量描述柔性梁的横向弯曲和纵向拉伸变形,并计及剪切效应.采用假设模态法离散变形场,运用第二类拉格朗日方程进行方程推导,得到系统考虑剪切效应的刚柔耦合动力学模型.基于全新的刚柔耦合动力学建模理论,研究不同轴向材料梯度分布的FGM楔形梁,通过数值仿真计算,分析讨论不同的转速、梯度分布规律以及变截面参数对系统动力学特性的影响.结果表明,剪切效应对大高跨比的FGM楔形梁的变形影响较为明显,不容忽略;材料梯度分布规律和截面参数的选取均会对旋转FGM楔形梁的动力学响应和频率产生较大影响.本文提出的考虑剪切效应的倾角刚柔耦合动力学模型是对以往非剪切模型的进一步完善,可应用于工程中的Timoshenko梁结构的动力学问题求解. 相似文献
5.
基于位移的有限梁单元中三次Hermite插值函数不能有效地描述变截面梁单元内部位移变化,只能通过加密网格增加单元数解决,会造成计算量增大。基于力的有限梁单元由于使用的力插值函数不受截面形状变化的影响,在处理变截面梁时有很大优势,可以得到精确的位移插值函数,利用较少的单元可以达到很高的精度,解决了基于位移的有限梁单元在处理变截面梁时的不足。本文得到了考虑剪切变形的位移插值函数和考虑转动惯量的一致质量矩阵。利用算例验证了本文理论的正确性和高效性。 相似文献
6.
<正> 求梁变形的方法很多,本文依据挠曲线近似微分方程,采用特定系致法求梁变形.该法可以写出具有特定系数的挠曲线方程,对于给定常用载荷梁,可以确定待定系数,由此得出梁的变形方程.对于梁弯曲变形的挠曲线近似微分方程,可写成 相似文献
7.
本文应用传递函数方法对等截面梁的有限变形进行了分析,对于等截面梁的有限变形问题,该方法从变分方程出发把问题表述为状态空间的形式,然后利用Gauss积分对轴力进行加速迭代求解,不需要进行增量迭代即可取得具有良好计算精度的数值结果,对简单受力的等截面梁情况该解可以看作是所讨论问题的精确解。对于受力比较复杂或者阶梯变截面梁情况,为减少运算量,可以和有限元法类似,采用多个单元进行拼接,从而得到问题的解。数值算例表明,本方法具有半解析、精度高、收敛快等特点。 相似文献
8.
在目前广泛应用的梁单元中,尚缺乏全面考虑以下四种因素影响的粱单元:(1)轴力的影响;(2)剪切交形的影响;(3)初始弯曲的影响;(4)弯曲变形对轴向应变的影响,即弓形效应。事实上,以上四种非线性因素都会对钢框架结构的稳定和极限承载力有影响,需同时考虑。本文将致力于推导同时考虑以上四种因素影响的平面梁单元的平衡微分方程,最后得到精确的粱单元刚度矩阵,并研究以上四种因素对钢框架构件及钢框架结构的影响。 相似文献
9.
对四种不同结构中心刚体-柔性Euler Bernoulli梁系统进行刚柔耦合动力学分析.其中以等截面梁、变截面梁、等截面回形梁、变截面回形梁为对象,研究楔形梁及回形梁对系统的末端变形位移影响.变截面梁的宽高尺寸沿着轴向线性变化.梁的变形包含了轴向、横向、耦合变形项(横向弯曲引起的纵向缩短).采用假设模态法和第二类Lagrange方程建立系统的动力学方程,并用C++编写软件进行动力学仿真.研究表明:在相同条件下,梁的截面尺寸及空心部分对梁末端变形位移影响十分明显,且当梁在较大变形情况下,该高次耦合模型依然能得到正确的结果,因此在针对实际结构建模时,建立符合实际截面的模型至关重要. 相似文献
10.
<正> 对于阶梯状变截面梁,其内力和变形的传递矩阵法求解,在文[1]中已有论述.但对于工程上常用到的含有楔形的变截面梁及加腋梁,若用一阶梯状梁来近似,仍采用等截面梁的传递矩阵进行计算,则不但计算工作量增加,而且只能得到近似解.笔者通过对楔形梁基本微分方程的推导,得到了楔形梁的传递矩阵,使在对含有线性变化截面梁段及等截面梁段进行传递矩阵法求解时,计算工作量减少,而且得到的解相当精确. 相似文献
11.
The dynamic stiffness matrix method is introduced to solve exactly the free vibration and buckling problems of axially loaded
laminated composite beams with arbitrary lay-ups. The Poisson effect, axial force, extensional deformation, shear deformation
and rotary inertia are included in the mathematical formulation. The exact dynamic stiffness matrix is derived from the analytical
solutions of the governing differential equations of the composite beams based on third-order shear deformation beam theory.
The application of the present method is illustrated by two numerical examples, in which the effects of axial force and boundary
condition on the natural frequencies, mode shapes and buckling loads are examined. Comparison of the current results to the
existing solutions in the literature demonstrates the accuracy and effectiveness of the present method. 相似文献
12.
丝束变角度复合材料具有变刚度的特点,因此其结构分析具有相当难度.本文采用状态空间法和微分求积法联合的半解析数值方法对丝束轴向变角度复合材料梁的弯曲问题进行研究.假设纤维方向角沿梁的轴向按照任意连续函数变化,选取位移和位移的一阶导数作为状态变量,建立了丝束轴向变角度复合材料梁弹性分析的状态空间方程,将状态变量对轴向坐标的导数采用微分求积法进行求解,进而可得问题的半解析数值解.通过与现有文献及ABAQUS计算结果的比较,验证了本文方法的正确性,并对微分求积法求解本问题的收敛性进行了分析.通过数值算例研究了纤维方向角沿梁轴向的变化对丝束轴向变角度复合材料梁的位移及应力分布的影响,研究结果可为该种结构的设计提供一定的参考. 相似文献
13.
Based on shear-deformable beam theory, free vibration of thin-walled composite Timoshenko beams with arbitrary layups under
a constant axial force is presented. This model accounts for all the structural coupling coming from material anisotropy.
Governing equations for flexural-torsional-shearing coupled vibrations are derived from Hamilton’s principle. The resulting
coupling is referred to as sixfold coupled vibrations. A displacement-based one-dimensional finite element model is developed
to solve the problem. Numerical results are obtained for thin-walled composite beams to investigate the effects of shear deformation,
axial force, fiber angle, modulus ratio on the natural frequencies, corresponding vibration mode shapes and load–frequency
interaction curves. 相似文献
14.
In this two-part contribution, a boundary element method is developed for the nonlinear dynamic analysis of beams of arbitrary doubly symmetric simply or multiply connected constant cross section, undergoing moderate large displacements and small deformations under general boundary conditions, taking into account the effects of shear deformation and rotary inertia. In Part I the governing equations of the aforementioned problem have been derived, leading to the formulation of five boundary value problems with respect to the transverse displacements, to the axial displacement and to two stress functions. These problems are numerically solved using the Analog Equation Method, a BEM based method. In this Part II, numerical examples are worked out to illustrate the efficiency, the accuracy and the range of applications of the developed method. Thus, the results obtained from the proposed method are presented as compared with those from both analytical and numerical research efforts from the literature. More specifically, the shear deformation effect in nonlinear free vibration analysis, the influence of geometric nonlinearities in forced vibration analysis, the shear deformation effect in nonlinear forced vibration analysis, the nonlinear dynamic analysis of Timoshenko beams subjected to arbitrary axial and transverse in both directions loading, the free vibration analysis of Timoshenko beams with very flexible boundary conditions and the stability under axial loading (Mathieu problem) are presented and discussed through examples of practical interest. 相似文献
15.
在广义概念上将建筑结构视为由同时考虑弯曲变形、剪切变形的两种子结构组成的双重抗侧力结构体系, 提出弹性阶段广义双重结构水平位移的统一的计算方法. 子结构单独承受水平外载荷时其内力与变形的关系服从Timoshenko剪切梁基本理论, 在子结构协同工作的基础上, 采用水平变形连续化的计算方法, 建立了广义双重抗侧力结构体系的统一位移微分方程, 以结构承受均布载荷作用为例推导出两个子结构的弯曲变形、剪切变形及结构总水平位移的通用解析表达式. 对框架-剪力墙结构与广义双重结构的位移微分方程式、微分方程特解、水平位移解析解进行了全面对比分析, 证明了框架-剪力墙结构是隶属于广义双重结构体系的一种具体表现形式; 算例分析表明, 对于一般中高层双重抗侧力结构, 采用解析法计算所得的位移结果能够满足一般工程设计的精度要求. 相似文献
16.
The literature regarding the free vibration analysis of Bernoulli–Euler and Timoshenko beams under various supporting conditions
is plenty, but the free vibration analysis of Reddy–Bickford beams with variable cross-section on elastic soil with/without
axial force effect using the Differential Transform Method (DTM) has not been investigated by any of the studies in open literature
so far. In this study, the free vibration analysis of axially loaded and semi-rigid connected Reddy–Bickford beam with variable
cross-section on elastic soil is carried out by using DTM. The model has six degrees of freedom at the two ends, one transverse
displacement and two rotations, and the end forces are a shear force and two end moments in this study. The governing differential
equations of motion of the rectangular beam in free vibration are derived using Hamilton’s principle and considering rotatory
inertia. Parameters for the relative stiffness, stiffness ratio and nondimensionalized multiplication factor for the axial
compressive force are incorporated into the equations of motion in order to investigate their effects on the natural frequencies.
At first, the terms are found directly from the analytical solutions of the differential equations that describe the deformations
of the cross-section according to the high-order theory. After the analytical solution, an efficient and easy mathematical
technique called DTM is used to solve the governing differential equations of the motion. The calculated natural frequencies
of semi-rigid connected Reddy–Bickford beam with variable cross-section on elastic soil using DTM are tabulated in several
tables and figures and are compared with the results of the analytical solution where a very good agreement is observed. 相似文献
17.
In this two-part contribution, a boundary element method is developed for the nonlinear dynamic analysis of beams of arbitrary doubly symmetric simply or multiply connected constant cross section, undergoing moderate large displacements and small deformations under general boundary conditions, taking into account the effects of shear deformation and rotary inertia. Part I is devoted to the theoretical developments and their numerical implementation and Part II discusses analytical and numerical results obtained from both analytical or numerical research efforts from the literature and the proposed method. The beam is subjected to the combined action of arbitrarily distributed or concentrated transverse loading and bending moments in both directions as well as to axial loading. To account for shear deformations, the concept of shear deformation coefficients is used. Five boundary value problems are formulated with respect to the transverse displacements, to the axial displacement and to two stress functions and solved using the Analog Equation Method, a BEM based method. Application of the boundary element technique yields a nonlinear coupled system of equations of motion. The solution of this system is accomplished iteratively by employing the average acceleration method in combination with the modified Newton–Raphson method. The evaluation of the shear deformation coefficients is accomplished from the aforementioned stress functions using only boundary integration. The proposed model takes into account the coupling effects of bending and shear deformations along the member, as well as the shear forces along the span induced by the applied axial loading. 相似文献
18.
In this paper the analog equation method (AEM), a BEM-based method, is employed for the nonlinear analysis of a Timoshenko
beam with simply or multiply connected variable cross section undergoing large deflections under general boundary conditions.
The beam is subjected in an arbitrarily concentrated or distributed variable axial loading, while the shear loading is applied
at the shear center of the cross section, avoiding in this way the induction of a twisting moment. To account for shear deformations,
the concept of shear deformation coefficients is used. Five boundary value problems are formulated with respect to the transverse
displacements, the axial displacement and to two stress functions and solved using the AEM. Application of the boundary element
technique yields a system of nonlinear equations from which the transverse and axial displacements are computed by an iterative
process. The evaluation of the shear deformation coefficients is accomplished from the aforementioned stress functions using
only boundary integration. Numerical examples with great practical interest are worked out to illustrate the efficiency, the
accuracy and the range of applications of the developed method. The influence of the shear deformation effect is remarkable. 相似文献
19.
蜂窝梁钢框架结构因梁截面沿长度周期性变化,不能直接采用普通钢框架结构矩阵位移法计算框架内力和位移.本文基于等效刚度法推导了矩形孔蜂窝梁的等效抗弯刚度、抗剪刚度和轴向刚度,建立了矩形孔蜂窝梁的单元刚度方程,提出了矩形孔蜂窝梁钢框架内力和位移计算方法.算例理论计算结果与有限元分析结果表明,两种方法计算结果非常接近.本文提出的等效刚度法概念清晰,准确性好,适用于计算蜂窝梁钢框架结构的内力和位移. 相似文献
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